review Quiz #1 (solutions have been uploaded to Files)
review the following concepts:
the difference quotient, which gives the slope of a secant line:
the definition of the derivative as the limit of difference quotients, which gives the slope of the tangent line to the graph y = f(x) at the point (a, f(a)):
finding the equation of the tangent line to y = f(x) at a point (x_1, f(x_1)) by using the point-slope equation of the line, with y_1 = f(x_1):
See Examples 3.1 – 3.3 in Sec 3.1 and Example 3.22 from Sec 3.3:
If you haven’t finished “Derivatives – Functions” yet (due later today), please consult the office hours recording from last Friday (Sept 30) as well as the recording of today’s office hours (Fri Oct 7).
(In particular, I went through “Derivatives – Functions” Problem 6, which involves a square root function. You can also look at Example 3.11 in Sec 3.2 of the textbook–I have included a screenshot of it below.)
After “Derivatives – Functions” please start working on the “Derivatives – Power Rule” and “Derivatives – Power Rule – Part 2:
“Derivatives – Power Rule”: we went through most of this yesterday in class, and you can also view the Tues Oct 4 office hours recording
“Derivatives – Power Rule”: I outlined how to approach some of these exercises at the end of office hours today
I may update this post over the weekend with additional hints on the Power Rule exercises.
Here are some notes and hints on the “Derivatives – Limit Definition” WebWork set:
The central concept here is the definition of the derivative of a given function f(x) at a point (a, f(a)) as the limit of secant line slopes, i.e., the limit as “x approaches a” of the ratio f(x) – f(a) (the rise Δy, or sometimes called Δf) over x – a (the run Δx), i.e., Δy/Δx:
So here’s the full definition of the derivative of f at the input value a, which we call f'(a):
This limit of the slopes of secant lines gives us the slope of the tangent line at (a, f(a)) (in the WebWork this is called “the instantaneous slope”)
Problem 1: In this exercise, you have to numerically calculate some secant slopes Δy/Δx for the the given f(x) and the given point (a, f(a)), and then use them to
For example, in this version of the exercise, the given function is f(x) = sqrt(16-x^2) and the given point is (a, f(a)) = (2, sqrt(12)), as shown on the graph:
I obtained the decimal approximations shown above for x = 1.5 by using a scientific calculator (I used Desmos) to calculate f(1.5) and
A good thing to do as you work through this exercise is to sketch the graph, plot each point (x, f(x)) on that graph and sketch each secant line as you compute its slope.
Problem 2: For this exercises, you have to write out Δy/Δx = [f(x) – f(a)] / [x – a] for the given function f(x) and the given point (a, f(a)).
In this case, the point is (-2, 9), and the function is the given quadratic polynomial, and I have typed in the solution for Δy/Δx:
For the 2nd part, in order to find the instantaneous slope by finding the limit, recall how we found such limits by factoring the polynomial in the numerator.
In a case like this, where the leading coefficient is a fraction, I would recommend multiplying the numerator and denominator by 2 in order to make all coefficient integers, i.e., work with:
You should see that you can factor the numerator, yielding a common factor of (x-2) which you can then cancel, which allows you to evaluate the limit as x goes to 2 (i.e., just plug in x =2!).
This class uses WeBWorK, an online homework system. Login information will be provided by your professor. For information about how to use the WeBWorK system, please see the WeBWorK Guide for Students.
The WeBWorK Q&A site is a place to ask and answer questions about your homework problems. HINT: To ask a question, start by logging in to your WeBWorK section, then click “Ask for Help” after any problem.
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